Process for the serial transmission of digital measurement data

ABSTRACT

In a serial transmission process for transmitting digital measurement data from a transmitter to a receiver, wherein at the transmitter end at least one absolute value of a continuously measured physical parameter and correction values describing alterations therein are transmitted in digital form to the receiver which forms updated measurement values from the transmitted values, to achieve lower transmission frequencies with a very high level of data incidence at the transmitter end, it is provided that both at the transmitter end and also at the transmitter end, using the mathematical equations which describe the physical laws in respect of alteration of the parameter to be measuringly detected, an exact value (α Txb ) is continuously predicted for a respective time (T x ) for which there is not yet a new measured value (α Tx ) at the receiver end, which exact calculated value represents the updated measurement value at the receiver end, that at the transmitter end upon the occurrence of the measured value (α Tx ) belonging to the respective time (T x ) being considered, its difference relative to the exact calculated value (α Txb ) is formed, and that at least one correction value δα Tx ) representing such a difference is transmitted to the receiver.

[0001] The invention concerns a process for the serial transmission of digital measurement data from a transmitter to a remotely disposed receiver, as set forth in the classifying portion of claim 1.

[0002] Hereinafter a conceptual distinction is made between values which are actually measured (=measurement values) and calculated values (=exact values), in which respect the latter are identified in that fashion for the reason that, as will be shown in detail hereinafter, within the respectively required range of measurement accuracy, they coincide with the associated, actually measured values, and can thus be correctly referred to as ‘exact’.

[0003] The expression that the physical parameter whose measurement values are to be transmitted is ‘continuously measured’ is intended to identify both measurement processes which continuously supply measurement values and also those in which the measurement values occur discontinuously at very short time intervals.

[0004] German laid-open application (DE-OS) No 44 43 959 discloses such a process in which the transmitter is arranged directly at a sensor and serves to transmit measurement data which are supplied by the sensor and which are prepared for transmission in digital form to a remotely disposed receiver, in such a way that a minimum level of complication and expenditure in respect of the connecting lines has to be involved. In that case, the sensor is a measuring device for permanently detecting a physical parameter, for example a temperature, a pressure and so forth.

[0005] A particularly important area of use for these processes is represented by positional and in particular rotational pickup senders or sensors, in which the physical parameter to be detected is the angular position of a rotating shaft. In that situation, the shaft may be stationary and it may also rotate at a high speed of rotation, for example 12000 rpm.

[0006] If, for a situation of use of that kind, there is a requirement for a high resolution capability of for example 22 bits for a full revolution of 2 Π and if levels of acceleration or deceleration respectively of up to 1×10⁵ s⁻² are permitted, then difficulties are incurred with the known process insofar as it is necessary to select an extremely high transmission frequency or rate in order individually to transmit the very high number of increments including their sign, which occur at high speeds, in such a way that the receiver can construct the respectively current angular position practically in real time as a progressive measurement value by addition of the increments, with the correct sign, to afford the last, completely ascertained absolute value.

[0007] In comparison therewith, the object of the present invention is to develop a process of the kind set forth in the opening part of this specification, in such a way that serial transmission of the measurement data is made possible even at very high rates of change or alteration in the physical parameter to be detected, practically in a real-time mode, without extremely high transmission frequencies being required for that purpose.

[0008] To attain that object, the invention provides the features recited in claim 1.

[0009] Those features according to the invention are based on the realisation that, if the alteration in respect of time of a physical parameter is steady, that is to say, can be continuously described by mathematical equations, there exists an n-th order derivative whose alteration within suitably selected measurement intervals only influences the measured value in such a way that the required level of measurement accuracy is maintained.

[0010] If the measured values of such a physical parameter are to be detected and transmitted from the transmitter to the receiver, then, instead of a transmission in accordance with DE-OS No 44 43 959, within a measurement interval which has commenced, for each future time T_(x) which is in that interval or at its end, an ‘exact value’ α_(Txb) can be calculated simultaneously both on the part of the transmitter and also the receiver by resolving the appropriate mathematical equation which generally involves an (n−1)-th order differential equation, wherein the expression ‘exact value’ is used to denote a value whose deviation from the value α_(Tx) which is actually measured at the future time T_(x) is so small that it coincides therewith, within the limits defined by the level of measurement accuracy required.

[0011] In accordance with that measurement accuracy and having regard to the possible options in terms of change or alteration, in particular the possible or intended maximum values of the time derivatives of the physical parameter to be measured, the length of the measurement intervals, that is to say the distance between the times at which the measured values are detected, as well as the n-th order number are established, in respect of which it can be assumed that within a measurement interval it does not alter beyond a predeterminable maximum value. That ordinal number n then defines the number of previously obtained, measured values α_(Tx−1), α_(Tx−2), α_(Tx−3) . . . which, jointly with the exactly known times T_(x−3), T_(x−2), T_(x−1), at which they have occurred, to solve the calculation equations, have to be inserted into same. The higher the order n of the time derivative of the measurement parameter (and thus the differential equations to be resolved), whose alteration influences the measurement parameter within the measurement interval within the limits of the required level of measurement accuracy, the greater must be the number of earlier measured values included in the calculation.

[0012] If for example in a situation involving monitoring and measuring the rotation of a shaft, the alteration in the angular acceleration can be deemed to be constant, it is theoretically sufficient, after ascertaining a starting measurement value, with ongoing calculation of new exact values, to rely once on three measured values. Further measurements and correction value transmissions would then no longer be required. That theoretical case can be envisaged, but in practice constancy of angular acceleration will persist only over some measurement intervals; it is therefore necessary to continuously implement measurement steps and in the ongoing calculations to rely in each case on three earlier measured values.

[0013] If in accordance with the invention the above-specified parameters are correctly established, then the predicted exact value α_(Txb) coincides with the value α_(Tx) which was actually measured at the time T_(x), within the limits given by the defined level of measurement accuracy.

[0014] The assumption that the time derivative of n-th order of the measurement parameter does not alter over a few measurement intervals is realistic, but it does not apply for just any number of successive measurement intervals. If now an alteration which is occurring begins to become effective, then the predicted exact value α_(Txb) is closer to one of the limits of the measurement accuracy range than would be the case without the occurrence of that alteration. In accordance with the invention, it is prevented from running out of the measurement accuracy range by virtue of the fact that, immediately after the end T_(x) of each measurement interval, at the transmitter end, the correction value δα_(Tx)=α_(Txb)−α_(Tx) which can be encoded in a few bits and generally even in only two bits (namely +1, 0, −1) between the calculated exact value and the actually measured value is ascertained and transmitted to the receiver. The sign of that correction value can be negative or positive; the essential consideration is that the correction value 0 is also transmitted.

[0015] The influence, contained in that correction value, of the n-th order time derivative which in a measurement interval is admittedly constant but which nonetheless under some circumstances changes over a longer period of time, that is to say including a plurality of measurement intervals, on the measurement value, is therefore continuously detected and transmitted to the receiver which then, just like the transmitter, can take it into account in the subsequent calculations, so that the further predicted exact values α_(T(x+1)b), α_(T(x+2)b), and so forth are still identical within the measurement accuracy range to the associated actually measured values α_(T(x+1)), α_(T(x+2)), and so forth only occurring after the respective calculation, and they can thus be correctly identified as ‘exact’.

[0016] For the cases which are of particular interest here, involving measurement tracking of the translatory or rotational movement of a body, for example angular measurement of a rotating shaft, the three prerequisites can be specifically stated in summarised form for applicability of the process according to the invention, as follows:

[0017] that both on the part of the transmitter and also the receiver, all calculations according to the invention are implemented in accordance with the same laws and relationships which describe the physical procedures involved;

[0018] that for each measured value α_(Tx) which is fed to a further processing step, the time T_(x) for which it reproduces the respective instantaneous value of the detected physical parameter is exactly known; and

[0019] that the time spacings T_(x−3)−T_(x−2), T_(x−2)−T_(x−1), T_(x−1)−T_(x) and so forth between two successive times T_(x−3), T_(x−2) and T_(x−2), T_(x−1) and T_(x−1), T_(x), respectively are ascertained for the measured values α_(Tx−3), α_(Tx−2), α_(Tx−1), α_(Tx) and subjected to further processing in accordance with the invention, are so small that in them the respective contribution afforded by the third time derivative of the physical parameter to be monitored (that is to say for example in a situation involving angular measurement, the alteration in respect of time of angular acceleration), to the instantaneous value, is no greater than the desired level of measurement accuracy or resolution.

[0020] For security reasons which will be discussed in greater detail hereinafter, it may also be important to satisfy a fourth prerequisite, more specifically, that the above-specified time spacings T_(x−3)−T_(x−2), T_(x−2)−T_(x−1), T_(x−1)−T_(x) and so forth are sufficient such that in them the respective contribution which is made by the second time derivative of the physical parameter to be monitored (that is to say in the case of angular measurement, the angular acceleration), to the instantaneous value, can be transmitted in encoded form within such a time spacing.

[0021] Then, the deviation ascertained by the transmitter of the calculated exact value α_(Txb) from the measured value α_(Tx) which occurs when the time T_(x) being considered occurs remains so small that it can be transmitted as a correction value δα_(Tx) in encoded form to the receiver even in a very short time, and the receiver then immediately corrects the value α_(Txb) which is also calculated thereby and which has been used hitherto.

[0022] In a particularly preferred alternative form of the process according to the invention the times which are involved in the procedure for ascertaining measurement values, that is to say both the past times T_(x−3), T_(x−2), T_(x−1) for which a measured value α_(Tx−3), α_(Tx−2), α_(Tx−1) is already known at both ends, that is to say at the transmitter and at the receiver, and also the time T_(x) for which firstly an exact value α_(Txb) is calculated and when the transmitter knows the associated new measured value α_(Tx) a correction value δα_(Tx) to be transmitted is ascertained, involve exactly identical time spacings which are known at both ends.

[0023] By virtue of those exactly identical time spacings (that is to say T_(x−3)−T_(x−2)=T_(x−2)−T_(x−1)=T_(x−1)−T_(x) and so forth), it is possible for the calculated exact value α_(Txb) already to be calculated in advance, that is to say before the occurrence of the time T_(x), by virtue of the fact that an intermediate value is calculated from the two last-measured values α_(Tx−2), α_(Tx−1), preferably by linear extrapolation to the future time T_(x), and added to that intermediate value with the correct sign is an alteration value Δα_(Tx−1) which is ascertained for the last time T_(x−1) which has already passed, which alteration value was in turn determined by a procedure whereby linear extrapolation was effected from the two measured values α_(Tx−3), α_(Tx−2) which are associated with the times T_(x−3), T_(x−2) which precede the time T_(x−1) preceding the time T_(x) being considered, to the preceding time T_(x−1), and the difference was formed between the intermediate value obtained in that way and the measured value α_(Tx−1) associated with the preceding time T_(x−1).

[0024] The exact value α_(Txb) calculated in that way differs from the measured value only when the contribution which is afforded by the second time derivative of the physical parameter to be monitored to the instantaneous value has altered in the period T_(x)−T_(x−1). The maximum error can only be equal to the deviation, corresponding to the correction value δα_(Tx), of the future alteration value Δα_(Tx) which occurs for the time T_(x) being considered, from the already known alteration value Δ_(α) _(Tx−1), and therefore when the above-mentioned third condition is met, it is within the limits of the desired level of measurement accuracy.

[0025] When then the time T_(x) has occurred, for which the prediction being considered was implemented, this then involves the newest measured value α_(Tx) and its deviation from the predicted exact value α_(Txb), that is to say the newest correct value δα_(Tx), which alone must be transmitted to the receiver so that it can exactly calculate the actually measured value α_(Tx).

[0026] As, when the three prerequisites stated above apply, the correction value δα_(Tx) is considerably smaller than each of the alteration values Δα_(Tx−1), Δα_(Tx) which are small in any case, it can be transmitted in such a short time, even at a comparatively low transmission frequency, that, by means of that correction value δα_(Tx) the receiver can calculate not only the measured value α_(Tx) applicable for the time T_(x), but also the measurement values, with the required level of accuracy and resolution, in real time, and make them available to a user, which occur for all times which are between the time T_(x) and the next time T_(x+1) for which a new correction value δα_(Tx+1) is supplied by the transmitter. That applies in particular also for the time at which transmission of the correction value δα_(Tx) is ended. For calculation of intermediate values which represent the physical parameter for times which are between the times T_(x) and T_(x+1), inter alia the last alteration value Δα_(Tx) is split up into a linear and a quadratic component.

[0027] In principle therefore it would suffice to transmit only a single time an absolute measured value and an alteration value and then only also correction values, by means of which the alteration values are updated at the receiver end, in which case the updated alteration values in turn serve to update the absolute measurement values.

[0028] As, in the case of a pure updating process, transmission errors as occur for example due to faults which have been incurred in the transmission path can give rise to considerable deviations between the updated and the actual values, although the error probability is slight due to the very small time spacings, preferably the procedure also involves repeatedly transmitting measured values and alteration values as such, so that it is possible to implement a compensating adjustment at the receiver end. In that case then the above-mentioned fourth prerequisite must be satisfied.

[0029] That transmission is preferably effected in bit-wise or bit group-wise fashion in interlaced or shared relationship with transmission of the correction values so that the above-mentioned conditions are still satisfied.

[0030] It should be emphasised once again that, when a new correction value δα_(Tx) occurs at the receiver, it is not only possible to calculate back to the measured value α_(Tx) present at the transmitter at the time T_(x) being considered which has occurred in the meantime, but it is also possible, for at least one time T_(x+1) after the time T_(x) being considered, and all times therebetween, to predict a respective exact value in real time. The only condition in that respect is that this later time T_(x+1) also involves the same spacing in respect of time in relation to the preceding time T_(x) which also separates the other times from each other.

[0031] The required exact time correlation between the various times can be implemented in a particularly simple fashion by those times being derived from a quartz-accurate frequency which is preferably generated at the receiver end and transmitted to the transmitter.

[0032] In that respect this frequency can be so established in per se known manner that it forms on a two-wire line serving for transmission purposes, a standing wave which is current-modulated in such a fashion that each of the half-waves thereof can represent a bit of the data to be transmitted, as is described in EP 716 404 A1.

[0033] The transmitted correction values which have been expressly referred to hereinbefore involve encoded differences in respect of values of the parameter to be measured, that is to say angular differences in the case of a rotating shaft. By virtue of the fixed time raster or grid which is predetermined in the present embodiment (exactly identically sized measurement intervals), that is equivalent to the transmission of correction values which directly represent alterations in a higher derivative such as for example the angular speed or angular acceleration and so forth. In the alternative configuration which is also described hereinafter, without a fixed time raster or grid, it may be advantageous, instead of the differences of the ‘local values’, to transmit such differences of higher time derivatives as correction values.

[0034] By means of the prediction procedure it is also possible to take account of signal transit and other delay times in the system. If for example at the receiver end there is a regulator which, on the basis of the measurement data supplied by the sensor, is intended to regulate the physical parameter to be monitored, to a value which can be predetermined in a variable fashion, then for example the time spacing between a time T_(x) being considered and a subsequent time, for which an exact value is predicted at the receiver end and transmitted to the regulator, can be altered until that time spacing corresponds to the system delay times, which can be recognised from the fact that the regulator operates in a stable mode and no longer oscillates.

[0035] In another alternative configuration of the process according to the invention the time spacings between the times T_(x−2), T_(x−1), T_(x) and so forth being considered do not have to be identically equal; the conditions however still apply that the transmitter and the receiver use the same calculation bases and that each of the variable time spacings is so small that in same the respective contribution which is afforded by the third time derivative of the physical parameter to be monitored to the instantaneous value is no greater than the desired level of measurement accuracy or resolution.

[0036] In this configuration of the process according to the invention, the calculated exact value α_(Txb) for a time T_(x) being considered can be calculated only after the occurrence thereof and after the transmitter has transmitted to the receiver a time stamp signal which characterises the absolute position in respect of time of that moment in time. As that transmission can take place within a very short time and transmission of the correction value calculated by the transmitter follows such transmission also very quickly, in this case also, in spite of the use of a comparatively low transmission frequency, the receiver is in a position to follow in a real-time mode the actual variation in the physical parameter to be monitored, by virtue of prediction procedures.

[0037] For attaining the object of the invention, it would be counter-productive to use as time stamp signals, complete encoded time measurement values because the amount of data entailed in that case would require a very high transmission frequency.

[0038] It is therefore preferable for the transmitter to measure the spacing in respect of time of the respective moment in time T_(x) from a predeterminable, periodically recurring significant point, preferably from the next following zero-passage of a quartz-accurately periodic reference signal which is available at both ends, and that it transmits that time spacing Δt_(Sx) as a time stamp signal to the receiver which, when it recognises the position in respect of time of the significant point in question of the reference signal, can form an exact time measurement value.

[0039] So that the receiver receives the required information relating to the position in respect of time of the significant point in question of the reference signal, it is sufficient if the transmitter sends to the receiver at the time T_(x) in question a signal of very short time length, in which case for example the leading edge of a signal bit can serve as that signal, and the receiver measures the time spacing Δt_(Ex) of that signal relative to the next occurring significant point in the reference signal, which generally, that is to say when the signal transit time on the transmission section is greater than half a period of the reference signal, is admittedly not identical to the significant point to which the time stamp signal ascertained by the transmitter refers, but is separated therefrom by a whole number of half-periods of the reference signal.

[0040] That number of half-periods also depends on the signal transit time, which can be presumed to be known, on the transmission path. On the assumption which can always be implemented that the fluctuations in the signal transit time are not more than ±¼ of the period length of the transmission frequency, the receiver can ascertain from Δt_(Ex), Δt_(Sx) and the approximate value of the signal transit time and the period length of the reference signal, the exact time T_(x) at which the respective measurement value was obtained, without the receiver having been transmitted from the transmitter more than the flank or edge of the signal bit and the associated time stamp signal Δt_(Sx) which can be encoded with a few bits, as in fact it only serves to resolve a half-period of the reference signal with the required level of accuracy.

[0041] These and other advantageous embodiments and developments of the process according to the invention are set forth in the appendant claims.

[0042] The invention will be described hereinafter by means of an embodiment.

[0043] For that purpose, consideration is given to a rotary pickup sender or sensor which measuringly traces the rotation of a shaft with a degree of resolution of 22 bits absolute and a further 26 bits per full revolution, wherein the shaft can reach a maximum speed of rotation of 12000 rpm and the maximum acceleration is ±1×10⁵ s⁻².

[0044] The measurement data produced are transmitted by the transmitter in digital form to the receiver on a twisted two-wire line, into which there is impressed from the receiver, as described in EP 0 716 404 A1, an ac voltage wave which at the same time also serves for the power supply at the transmitter end and whose frequency is tuned with quartz accuracy to the line length in such a way that there is a standing wave at least for a binary state which is to be impressed by current modulation. With a line length of 150 m, with a suitable relative dielectric constant, the frequency is for example 329.5 kHz, this affording an oscillation period of about 3 μs, within which 2 bits can be transmitted.

[0045] Transmission is effected in a procedure such that bits which represent an angle absolute value are interlaced with bits which represent correction values, change or alteration values, protocol data, angular acceleration values, elements of an identification mask and further items of information.

[0046] A suitable protocol can be for example of the following form:

k/k/a/a/a/a/a/p/m/r/ k/k/a/a/a/a/a/p/m/r/ k/k/a/a/a/a/a/p/m/r/ k/k/a/a/a/a/a/p/m/r/

[0047] wherein k denotes a correction value bit, a denotes an alteration or change value bit, p denotes an absolute value position bit, m denotes a mask bit and r denotes a reserve bit for further information. In this respect the blocks in actual fact are in directly adjoining relationship; the spaces are only inserted hereinbefore for the sake of clarity.

[0048] The reserve bits can be used for example in order to transmit permanently interlaced incremental values or in between times repeatedly angular acceleration values which can be formed by multiple difference formation from the position measurement values of the rotary sensor or which can be supplied by a specific acceleration sensor.

[0049] In comparison, the mask bits which can be provided in each block at any location which however is always the same after establishment thereof has been effected serve for identification of the beginning of the word.

[0050] Here the block k/k/a/a/a/a/a/p/m/r/ is of a length of 10 bits and can be transmitted by means of 5 periods of the frequency of 329.5 kHz, that is to say in about 15 μs. The starting time of the transmission of each such block is referred to hereinafter as the ‘transmission time’ T_(x), for which a new measured value α_(Tx) is to occur on the part of the transmitter.

[0051] As each block contains only a single bit for the absolute value in respect of the angular position, 48 such blocks must be transmitted until the receiver has received a complete absolute value which however, when the last bit reaches the receiver, is already about 720 μs ‘old’, that is to say it can differ considerably from the instantaneous position value.

[0052] In order to be able to make available in a real-time mode measurement values which are updated at the receiver end and which differ as little as possible from the actual angular position, the procedure involved is therefore as follows:

[0053] It will be assumed that at least three values α_(Tx−3), α_(Tx−2) and α_(Tx−1) measured at earlier transmission times T_(x−3), T_(x−2) and T_(x−1) are already known both at the transmitter end and also at the receiver end. Then, at both ends, there is also an alteration or change value Δα_(Tx−1) which has been ascertained for the time T_(x−1), so that both the transmitter and also the receiver can already predict at the time T_(x−1) an exact value α_(Txb) for the time T_(x) in accordance with the recursion formula:

α_(Txb)=2 α_(Tx−1)−α_(Tx−2)+Δα_(Tx−1)   (1)

[0054] It will be seen that an intermediate value 2 α_(Tx−1)−α_(Tx−2) is formed from the values α_(Tx−2) and α_(Tx−1) by linear extrapolation to T_(x), and summed with the alteration value Δα_(Tx−1) which was formed for the last transmission time T_(x−1) and which can be positive or negative.

[0055] That alteration value Δα_(Tx−1) which like all other alteration values Δα_(T) at a predetermined maximum acceleration ε and a predetermined spacing in respect of time Δt cannot exceed the value εΔt², had in turn been ascertained in accordance with an equation corresponding to formula (1), using the measured values α_(Tx−3), α_(Tx−2), αT_(x−1) for the times T_(x−3), T_(x−2), T_(x−1);

Δα_(Tx−1)=α_(Tx−1)−(2 α_(Tx−2)−α_(Tx−3)).   (1a)

[0056] Until the occurrence of the time T_(x) at which and for which there is a new correct measured value α_(Tx) at the transmitter, the calculated exact value α_(Txb) is used as a substitute for the future measured value α_(Tx).

[0057] When then the time T_(x) occurs, then initially only the transmitter knows the new measured value, by means of which without a relevant time delay it calculates the new correction value δα_(Tx) in accordance with the equation:

δα_(Tx)=α_(Txb)−α_(Tx).   (2)

[0058] As soon as that correction value including its sign is transmitted to the receiver by the first two bits k/k/ of the protocol block which is just beginning, that is to say in the present example after 3 μs, the receiver is therefore also in a position, without relevant time delay, to calculate the current, updated, exact measured value α_(Tx) and the alteration value Δα_(Tx), in accordance with the following equations:

α_(Tx)=α_(Txb)+δα_(Tx)   (2a)

[0059] and

Δα_(Tx)=Δα_(Tx−1)+δα_(Tx).   (3)

[0060] It should be expressly pointed out that this is already possible after 3 μs, that is to say still before the current alteration value Δα_(Tx) which is also ascertained by the transmitter is transmitted to the receiver. Theoretically therefore Δα_(Tx) would no longer have to be transmitted at all. For security reasons however transmission thereof is preferably implemented in each protocol block in order to be able to detect any transmission errors which may occur and possibly correct them.

[0061] It can be shown that each correction value δα_(T), due to rounding errors, can only occur in each case in the range of between 0 and −3 increments (in the case of the present example which with an acceleration gradient of 10⁸/s³ is based on maximum conditions, in actual fact however it can also alter within <32 μs at best by 1 increment); therefore its representation including sign is always possible with only two bits and a transmission within 3 μs. As this third time derivation of the angular position which is to be measuringly tracked scarcely alters in that time even at maximum angular speed and/or acceleration, the updated values calculated by the receiver for the period from T_(x) to T_(x+1) reproduce the respective actual measurement value in real time with an accuracy of ±1 increment.

[0062] In another process in accordance with the invention the condition that the times being considered, at which a respective new measured value occurs at the transmitter, must involve identical spacings, can be omitted. That however requires the position of those times to be accurately determined on an absolute time scale and characterised by a time stamp signal which must then be transmitted from the transmitter to the receiver. A specific operating procedure which makes it possible to transmit such a highly accurate time stamp signal at a comparatively low frequency will be described in greater detail hereinafter.

[0063] Admittedly, the time spacings between the times being considered no longer have to be of equal lengths, but the above-specified prerequisites nonetheless still apply, that the transmitter and the receiver execute their calculations on the basis of the same laws and that each of the time spacings which are now variable is so small that therein the respective contribution which is afforded by the third time derivative of the physical parameter to be monitored to the instantaneous value is no greater than the desired level of measurement accuracy or resolution.

[0064] Then, instead of the above-listed equations (1) to (3), somewhat different relationships apply:

[0065] It will be assumed that the system begins at a time T₀ with a measured value α_(To)=0. The following then applies, for a new measured value α_(T1) which occurs at a time T₁: $\begin{matrix} {\alpha_{T1} = {\frac{ɛ_{01}}{2}\Delta \quad t_{01}^{2}}} & (4) \end{matrix}$

[0066] wherein Δt₀₁ is the time difference between the two times T₀ and T₁. In accordance with the equations: $\begin{matrix} {ɛ_{01} = \frac{2\alpha_{T1}}{\Delta \quad t_{01}^{2}}} & \left( {4a} \right) \end{matrix}$

[0067] and

ω₁=ε₀₁Δt₀₁   (4b)

[0068] the transmitter then calculates the mean acceleration ε₀₁ which occurred in the period Δt₀₁, and the speed {overscore (ω)}₁ which prevails at the time T₁, and sends firstly values α_(T1) and a time stamp signal (see below) characterising the time T₁ to the receiver which can calculate therefrom on the one hand Δt₀₁, and on the other hand, in accordance with foregoing equations (4a) and (4b), the mean acceleration ε₀₁ and the speed {overscore (ω)}₁.

[0069] When then at a time T₂ the transmitter has a new measured value α_(T2), it does not send that value but only the time stamp signal which characterises the time T₂ and which enables the receiver to calculate the time spacing Δt₁₂ between the times T₂ and T₁.

[0070] On the basis of those values, both the transmitter and also the receiver can then calculate an exact value α_(T2b) for the time T₂ which has only just occurred, in accordance with the following equation: $\begin{matrix} {\alpha_{T2b} = {\alpha_{T1} = {{\omega_{1}\Delta \quad t_{12}} + {\frac{ɛ_{01}}{2}\Delta \quad t_{12}^{2}}}}} & (5) \end{matrix}$

[0071] It should be expressly emphasised once again at this point that all calculations which are to be executed in accordance with the invention can be implemented in such a short time that this computing time is negligibly small in comparison with the transmission times.

[0072] As the transmitter already has the new measured value α_(T2), it can calculate from the difference Δt₁₂ between the times T₁ and T₂ and the measured value α_(T2) which was obtained at the time T₂, the speed {overscore (ω)}₂ prevailing at that time, the mean acceleration ε₁₂ prevailing in the period Δt₁₂, and the first correction value

δα_(T2)=α_(T2)−α_(T2b)   (6)

[0073] and transmit same to the receiver which, by means of that correction value δα_(T2), can calculate the measured value α_(T2) from the exact value α_(T2b) previously used for the time T₂.

[0074] The transmitter and the receiver now have all parameters in order to calculate from the equation for the actual measured value: $\begin{matrix} {\alpha_{T2} = {\alpha_{T1} + {\omega_{1}\Delta \quad t_{12}} + {\frac{ɛ_{12}}{2}\Delta \quad t_{12}^{2}}}} & (7) \end{matrix}$

[0075] the mean acceleration ε₁₂ prevailing in the period between T₁ and T₂.

[0076] For a time T₃ which occurs later and in which the transmitter entails a new measured value α_(T3), the transmitter initially again transmits the associated time stamp signal so that both ends can calculate the time difference Δt₂₃.

[0077] From that time difference Δt₂₃ and the speed {overscore (ω)}₁ prevailing at the time T₁, and the mean acceleration ε₁₂ ascertained in accordance with equation (7), the receiver, in accordance with the following equation:

ω₂=ω₁+ε₁₂Δt₂₃   (8)

[0078] calculates the speed {overscore (ω)}₂ prevailing at the time T₂, so that now, with the exception of the most recent measured value α_(T3) and the associated correction value δα_(T3), it now has the same information as the transmitter and it can calculate a new calculated exact value α_(T3b) for the time T₃, in accordance with an equation corresponding to equation (5).

[0079] If an inquiry for a measurement value which for example is associated with any time T_(2x) between the times T₂ and T₃ comes to the receiver from a user, then by means of the data already available to the receiver, for that intermediate time T_(2x), the receiver can calculate an exact value in accordance with the following equation: $\begin{matrix} {\alpha_{{T2} \times b} = {\alpha_{T2} + {\omega_{2}\Delta \quad t_{22 \times}} + {\frac{ɛ_{12}}{2}\Delta \quad t_{22 \times}^{2}}}} & (9) \end{matrix}$

[0080] wherein Δt_(22x) is the spacing in respect of time between the moments in time T₂and T_(2x).

[0081] This calculated exact time α_(T2b) also corresponds to the value, which is actually present at the time T_(2x) in question, of the physical parameter to be monitored, with a high level of accuracy.

[0082] For further times T₄, T₅, T₆ and so forth, the procedure just described above can be continued in a corresponding fashion.

[0083] It is important that the transmissions of the time stamp signal and the alteration value can be effected in a substantially shorter time than would be required for transmission of the complete measurement value. In actual fact, the transmission time required in accordance with the invention is so short that even in this alternative configuration, the receiver can follow the actual variation in the physical parameter to be monitored, by a predictive procedure, in real time.

[0084] In that respect a point of essential significance is that the time stamp signal represents the respective moment in time in a form which is compressed in such a fashion that transmission is possible within a very short time.

[0085] In order to achieve this, a preferred alternative configuration of the process according to the invention provides that a periodic quartz-accurate reference signal serving as a time standard is available both for the transmitter and also the receiver, that reference signal preferably being sent from the receiver to the transmitter. At both ends, the periods or half-periods of that reference signal are counted starting from a zero point signal which the receiver sends to the transmitter in the same manner as is described hereinafter for time signal communication from the transmitter to the receiver.

[0086] If the transmitter involves a fresh measured value at a time T_(n), then firstly it sends the receiver a signal bit whose leading flank or edge serves as a time marker. In addition the transmitter measures the time spacing Δt_(nS) of that time marker in relation to an agreed significant point, for example the next zero-passage of the reference signal, and transmits it as a time stamp signal in encoded form to the receiver.

[0087] When the receiver receives the time marker, it also measures its time spacing Δt_(nE) in relation to the next significant point, for example the next zero-passage of the reference signal. In that case, the two zero-passages referred to will generally not be identical, by virtue of the signal transit time on the transmission path.

[0088] On condition that the signal transit time on the transition path fluctuates by not more than ÷¼ of the period length of the reference signal, the receiver can ascertain from the transmitted time stamp signal Δt_(nS), the time spacing Δt_(nE) measured by the receiver itself and the signal transit time which is known apart from instantaneous fluctuations, to which zero-passage the time stamp signal Δt_(nS) of the transmitter relates. As that time stamp signal Δt_(nS) serves only for time resolution of a period length of the reference signal, it can be encoded with a few bits and transmitted in a very short time.

[0089] Here too the principle according to the invention is again applied, that both on the part of the transmitter and also the receiver, on the basis of the same mathematical and physical laws, calculations are carried out which make it possible on the part of the receiver to obtain information with a maximum degree of accuracy although only a minimum amount of information was transmitted by the transmitter.

[0090] In contrast to the first of the two processes set forth, in which a 2-wire line is sufficient for transmission between the transmitter and the receiver, the last-described process preferably uses a 3-wire line. Here one line serves as system ground. The second transmits the supply voltage and the reference signal (for example 10 MHz). The third is used for bi-directional data transmission.

[0091] That system then admittedly has one line more, but in return it affords the option of sending large amounts of data in both directions, this being almost simultaneously because of the extremely short time-sharing procedure. That means that only about 10 μs are required for the transmission of data from the transmitter to the receiver, which at latest must be effected every 32 μs. The remaining time can be used for the transmission of a similarly large amount of data in the opposite direction.

[0092] That affords the advantage that a large amount of data can also be transmitted at high frequency from the receiver to the transmitter, in which respect it is possible to use an ASSI-interface (asynchronous-synchronous-serial interface).

[0093] It will be noted from the foregoing description that the described processes can be used not only for rotary or angle sensors but also for linear sensors and quite generally sensor devices which measuringly detect and track other physical parameters. 

1. A process for the serial transmission of digital measurement data from a transmitter to a remotely disposed receiver, wherein at the transmitter end at least one absolute value of a continuously measured physical parameter and correction values describing alterations in said parameter are prepared in digital form and transmitted to the receiver which forms updated measurement values from the transmitted values, characterised in that both on the part of the transmitter and also on the part of the receiver, using mathematical equations which describe the physical laws in respect of alterations in the parameter which is to be measuringly detected, an exact value (α_(Txb)) is continuously calculated in advance for a respective time (T_(x)) for which there is not yet a new measured value (α_(Tx)) on the part of the receiver, said calculated exact value (α_(Txb)) representing the updated measurement value at the receiver, that on the part of the transmitter, when the measured value (α_(Tx)) belonging to the respective time (T_(x)) being considered is present, its difference in relation to the exact calculated value (α_(Txb)) is formed, and that at least one correction value (δα_(Tx)) representing such a difference is transmitted to the receiver, wherein the calculation of the exact value (α_(Txb)) involves so many known measured values (α_(Tx−1), α_(Tx−2), . . . ), each of which was ascertained for a respective accurately known earlier time (T_(x−1), T_(x−2), . . . ), that the correction value (δα_(Tx)) representing the difference can be encoded with such a small number of bits to be transmitted, that the deviation between the calculated and the measured value always remains within the required level of measurement accuracy.
 2. A process as set forth in claim 1 characterised in that the times (T_(x−2), T_(x−1), T_(x)) are of equal spacings in respect of time, which are accurately known both on the part of the transmitter and also on the part of the receiver, and that calculation of the exact value (α_(Txb)) associated with a time (T_(x)) being considered is already effected at both ends before the occurrence of the time (T_(x)) being considered.
 3. A process as set forth in claim 2 characterised in that prediction of the exact value (α_(Txb)) for a time (T_(x)) being considered is effected by summing with the correct sign of an alteration value (Δα_(Tx−1)) and an intermediate value which was ascertained by extrapolation from the measured values (α_(Tx−1), α_(T) _(x−2)) which are associated with the two times (T_(x−1), T_(x−2)) preceding the time (T_(x)) being considered, wherein that alteration value (Δα_(Tx−1)) is equal to the difference between the measured value (α_(Tx−1)) belonging to the preceding time (T_(x−1)) and a preceding intermediate value which was ascertained by extrapolation from the measured values (αT_(x−2), α_(Tx−3)) which belong to the two times (T_(x−2), T_(x−3)) preceding the preceding time (T_(x−1)).
 4. A process as set forth in claim 3 characterised in that after transmission of the respective correction value (δα_(Tx)), the current alteration value (Δα_(Tx)) is also transmitted.
 5. A process as set forth in one of claims 2 through 4 characterised in that the times (T_(x−2), T_(x−1), T_(x)) are exactly synchronised with a quartz-accurate transmission frequency produced by the receiver.
 6. A process as set forth in claim 5 characterised in that transmission from the transmitter to the receiver is effected on a 2-wire line on which a standing electrical wave whose frequency is the transmission frequency is produced by the receiver.
 7. A process as set forth in claim 1 characterised in that the position in respect of time of the moments in time (T_(x−2), T_(x−1), T_(x)) which do not necessarily involve equal time spacings are measuringly detected and characterised by a suitable time stamp signal, and that calculation of the exact value belonging to a time (T_(x)) being considered is effected at the transmitter immediately after the occurrence of that time (T_(x)) and at the receiver immediately when it has received from the transmitter the time stamp signal marking the time (T_(x)) being considered.
 8. A process as set forth in claim 7 characterised in that measuring detection of the position in respect of time of the times (T_(x−2), T_(x−1), T_(x)) is effected in each case by a procedure whereby, at the transmitter end, the time spacing of the time (T_(x)) in question from a predeterminable significant point of a defined period of a quartz-accurately periodic, electrical reference signal which is available both at the transmitter and also at the receiver is measured and transmitted as a time stamp signal (Δt_(Sx)) to the receiver which evaluates same having regard to the signal transit time on the transmission path.
 9. A process as set forth in claim 8 characterised in that the significant point adopted is the last zero-passage of the reference signal which directly follows the time (T_(x)) considered.
 10. A process as set forth in claim 9 characterised in that the signal transit time on the transmission path is taken into consideration by a procedure whereby at the time (T_(x)) in question the transmitter sends a time marker signal to the receiver which measures its time spacing (Δt_(Ex)) from the next zero-passage of the electrical reference signal, and that, from the time spacing (Δt_(Ex)) measured by the receiver, the time stamp signal (Δt_(Sx)), the accurately known period duration, of the electrical reference signal and the signal transit time which is known in units of said period duration on the transmission path on which the time stamp signal (Δt_(Sx)) is transmitted, the receiver ascertains the zero-passage in relation to which the transmitter measured the time stamp signal (Δt_(Sx)).
 11. A process as set forth in one of claims 7 through 10 characterised in that measurements of the time spacings (Δt_(Sx) Δt_(Ex)) are effected by counting the periods of a quartz-accurately periodic measurement signal whose frequency is of a magnitude selected in accordance with the desired resolution of the reference signal periods.
 12. A process as set forth in one of claims 7 through 10 characterised in that measurements of the time spacings (Δt_(Sx) Δt_(Ex)) are effected by an analog procedure and the resulting measurement values are digitised.
 13. A process as set forth in one of claims 7 through 12 characterised in that the respective time stamp signal (Δt_(Sx)) is transmitted in digital form to the receiver.
 14. A process as set forth in one of the preceding claims characterised in that for at least one time which is between a time (T_(x)) being considered and the next time (T_(x+1)) which follows at an accurately defined time spacing, an exact value is predicted by interpolation.
 15. A process as set forth in one of claims 7 through 14 characterised in that transmission between the transmitter and the receiver is effected on a 3-wire line, wherein the system ground (V_(SS)) is on one of the wires while the second wire carries the supply voltage (V_(DD)) and the reference signal and the third wire serves as a bidirectional data line.
 16. A process as set forth in one of the preceding claims characterised in that the physical parameter is the position of a body with respect to its surroundings.
 17. A process as set forth in claim 16 characterised in that the alteration values are ascertained at the transmitter end by counting increments, wherein upward counting is effected for one of the two directions of movement and downward counting is effected for the other direction.
 18. A process as set forth in one of the preceding claims characterised in that at the transmitter end positional and/or alteration values initially ascertained in analog form are digitised prior to transmission.
 19. A process as set forth in claim 18 characterised in that the analog values which are intended for analog/digital conversion are recorded at times which are correlated with a quartz-accurate frequency.
 20. A process as set forth in one of the preceding claims characterised in that the bits representing the various values are transmitted in interleaved or shared relationship.
 21. A process as set forth in one of the preceding claims characterised in that the bits are transmitted in group-wise manner in interleaved or shared relationship.
 22. A process as set forth in one of claims 20 and 21 characterised in that at the transmitter end the increments are continuously further counted beyond the times (T_(x−1), T_(x), T_(x+1)) at least over the period of time required for complete interleaved or shared transmission of an absolute value. 